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I have a 3D scene and I want "litter" it with X number of objects placed randomly within the viewing frustum.

I tried using 3 randoms: X + Y (viewport 0..1), and then Z distance from camera and then projecting using the camera distance. However this doesn't yield a uniform distribution and there are too many objects close to the camera and too few further away.

There is the option of generating a random point within the cube and filtering those points that are outside the view frustum, but I'm generating a shitload of these and I'm worried about performance.

How can I generate a random point inside a frustum in a uniformly distributed manner?

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Distribute the points in NDC space and back project them with an inverse frustum transformation and w-divide into view space.

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I'm sorry you lost me... I understand the clip space part and the back projection, however if I'm not mistaken so far that would yield a non-uniform result? I don't understand what you mean by w-divide into view space? – Amir Abiri Jun 16 '12 at 15:18
    
@AmirAbiri: Look at the typical transformation pipeline. First you multiply view space coordinates with the projection matrix P: r_clip = P * r, and then, to introduce the perspective effect the w divide is applied to reach NDC r_NDC.{x,y,z,w} = r_clip.{x,y,z,w} / r_clip.w. You've to go the exact opposite direction. I recommend taking a look at the sourcecode of gluUnProject (you can find it in the Mesa3D sources). – datenwolf Jun 16 '12 at 15:31
    
So if I understand correctly, we'd be essentially picking random points in {0..1, 0..1, 0..1} where X and Y represent the normalized screen coordinates and the Z component is the normalized distance between the near clip and the far clip, and then reverse-project this back to world coordinates? – Amir Abiri Jun 17 '12 at 1:03
    
@AmirAbiri: Indeed. – datenwolf Jun 17 '12 at 7:49
    
Correct me if I'm wrong but that wouldn't yield a uniform distribution inside the resulting frustum? There should be less chance for an object to appear at z=0 then at z=h. – Amir Abiri Jun 17 '12 at 11:20

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